Can anyone out there help me understand what Linearizability is? I need an explanation that is simple and easy to understand. I'm reading The Art of Multiprocessor Programming by Maruice Herilihy and Nir Shavit and am trying to understand Chapter 3 about Concurrent Objects.

I understand that a method is Linearizable if it has a point where it seems to "take effect" instantaneously from the point of view of the other threads. That makes sense, but it is also said that Linearizability is actually a property of the execution history. What does it mean for an execution history to be Linearizable, why do I care, and how does it relate to a method or object being Linearizable?

Thank you!

up vote 12 down vote accepted

A single object is considered linearizable if

(a) each of its methods is atomic. Imagine them as java synchronized methods, but more below.

(b) there can be at most one pending operation from any given thread/processor.

(c) the operations must take effect before they return. It is not acceptable for the object to enqueue them to perform them lazily.

Now, (a) can be loosened a lot more. Linearizability requires that the the effect of that operation is atomic. So, an add operation in a lock-free linked list will have one point in its execution (a "linearization point") before which that element wasn't added, and after which the element is definitely in. This is better than obtaining locks, because locks can block indefinitely.

Now, when multiple threads call a linearizable object concurrently, the object behaves as if the methods are called in some linear sequence (because of the atomicity requirement); two overlapping calls could be made linear in some arbitrary order.

And because they are forced to have an effect sometime during the method invocation (stacks must push/pop, sets must add/delete etc.), the object can be reasoned about with well-known sequential specification methods (pre and post conditions etc).

While we are at it, the difference between linearizability and sequential consistency is that the latter does not require (c). For a sequentially consistent data store, a method does not have to have an effect right away. In other words, a method invocation is merely a request for action, but not the action itself. In a linearizable object, a method invocation is a call to action. A linearizable object is sequentially consistent, but not the other way around.

Maybe a confusion between Linearizability versus Serializability.

From this article (P. Bailis):

Linearizability is a guarantee about single operations on single objects [...] Linearizability for read and write operations is synonymous with the term “atomic consistency” and is the “C,” or “consistency,” in Gilbert and Lynch’s proof of the CAP Theorem.

Serializability is a guarantee about transactions, or groups of one or more operations over one or more objects. It guarantees that the execution of a set of transactions (usually containing read and write operations) over multiple items is equivalent to some serial execution (total ordering) of the transactions [...] Serializability is the traditional “I,” or isolation, in ACID.

  • You wrote "over multiple items is equivalent to some serial execution". Do you mean "to at least one serial execution" or "to all possible serial executions"? – Nearoo May 9 at 15:03
  • In my understanding, "to at least one". For example if you play two transactions T1 and T2 on a system with Serializability, then the final result must be equivalent to "T1 then T2" OR "T2 then T1". – mcoolive May 9 at 21:20

Well, I think I can answer this question concisely.

When we are going to tell whether a concurrent object is correct, we always try to find a way to extend the partial order to a total order.

we can recognize whether a sequential object is correct much more easily.

First, Let's put the concurrent object aside. We will discuss it later. Now let's consider a sequential history H_S, a sequential history is a sequence of events(i.e Invokes and Responses) of which each Invoke is followed instantaneously by its corresponding Response.(Ok, "instantaneously" could be confused, consider the execution of a single-threaded program, of course there's an interval between each Invoke and its Response, but the methods are executed one by one. So "instantaneously" means that no other Invoke/Respone can stick into a pair of Invoke_i~Response_i)

The H_S may looks like:

H_S : I1 R1 I2 R2 I3 R3 ... In Rn
(Ii means the i-th Invoke, and Ri means the i-th Response) 

It will be very easy to reason about the correctness of the history H_S, because there isn't any concurrency, what we need to do is to check whether the execution works as well as what we expect(meet the conditions of the sequential specification). In other words, is a legel sequential history.

Ok, the reality is we are working with a concurrent program. For example, we run two threads A and B in our program. Everytime we run the program, we will get a history H_C(History_Concurrent) of exection. We need to consider a method call as Ii~Ri as above in H_S. Of course, there must be a lot of overlaps between method calls called by thread A and thread B. But each event(i.e Invokes and Responses) has it's real-time order. So the Invokes and Response of all the methods called by A and B can be mapped to a sequential order, the order may look like:

H_C : IA1 IB1 RA1 RB1 IB2 IA2 RB2 RA2

The order seems to be confused, it's just the sort of the events of each method calls:

thread A:         IA1----------RA1               IA2-----------RA2
thread B:          |      IB1---|---RB1    IB2----|----RB2      |
                   |       |    |    |      |     |     |       |
                   |       |    |    |      |     |     |       |
real-time order:  IA1     IB1  RA1  RB1    IB2   IA2   RB2     RA2

And we got the H_C. So how could we check whether the execution of H_C is correct? We can reorder the H_C to a H_RO following the rule:

RULE: If one method call m1 precedes another m2, then the m1 must precedes m2 in the reordered sequence. (It means that if Ri is in front of Ij in the H_C, you must guarantee that Ri is still in front of Ij in the reordered sequence, i and j doesn't have their orders , we can also use a,b,c...) We say that H_C is equivalent to H_RO(history_reorder) under such rule.

The H_RO will have 2 properties:

  1. It respects the program order.
  2. It preserves the real-time behaviour.

Reorder the H_C without violating the rule above, we can get some sequential histories(which are equivalent to H_C), For example:

H_S1: IA1 RA1 IB1 RB1 IB2 RB2 IA2 RA2
H_S2: IB1 RB1 IA1 RA1 IB2 RB2 IA2 RA2
H_S3: IB1 RB1 IA1 RA1 IA2 RA2 IB2 RB2
H_S4: IA1 RA1 IB1 RB1 IA2 RA2 IB2 RB2

However, we cannot get a H_S5:

H_S5: IA1 RA1 IA2 RA2 IB1 RB1 IB2 RB2

because IB1~RB1 wholly precedes IA2~RA2 in the H_C, it cannot be reordered.

Now, with these sequential histories, how could we confirm whether our execution history H_C is correct?(I highlight the history H_C, it means that we just take care about correctness of history H_C now rather than the correctness of the concurrent program)

The answer is straightforward, if at least one of the sequential histories is correct(a legal sequential history meet the conditions of the sequential specification), then the history H_C is linearizable, we call the legal H_S the linearization of the H_C. And H_C is a correct execution. In other words, it is a legal execution that we expected. If you have experience on concurrent programming, you must have written such program which sometimes looks quite well but sometimes be wholly wrong.

Now we have known what is a linearizable history of a concurrent program's execution. So what about the concurrent program itself?

The basic idea behind linearizability is that every concurrent history is equivalent, in the following sense, to some sequential history. [The Art of Multiprocessor Programming 3.6.1 : Linearizability] ("following sense" is the reorder rule I have talked about above)

Ok, the reference may be a little confused. It means that, if every concurrent history has a linearization(legal sequential history equivalent to it), the concurrent program meets the conditions of linearizability.

Now, we have understood what is Linearizability. If we say our concurrent program is linearizable, in other words it has the property of linearizability. It means that everytime we run it, the history is linearizable(the history is what we expect).

So it is obvious that linearizability is a safety(correctness) property.

However, the method of reordering all the concurrent histories to sequential history to judge whether a program is linearizable is only possible in prinple. In Practice, we are faced with thounds of method calls called by double-digit threads. We cannot reorder all the historys of them. We cannot even list all of the concurrent histories of a trival program.

The usual way to show that a concurrent object implementation is linearizable is to identify for each method a linearization point where the method taks effect. [The Art of Multiprocessor Programming 3.5.1 : Linearization Points]

We will discuss about the question under the conditions of "concurrent object". It is substantially as same as above. An implementation of a concurrent object has some methods to access the data of the concurrent object. And multi-threads will share a concurrent object. So when they access the object concurrently by calling the object's methods, the implementor of the concurrent object must ensure the correctness of the concurrent method calls.

He will identify for each method a linearization point. The most important thing is to understand the meaning of linearization point. The statement of "where the method takes effect" is really hard to understand. I have some examples:

First, let's look at a wrong case:

//int i = 0; i is a global shared variable.
int inc_counter() {
    int j = i++;
    return j;

It's quite easy to find the error. We can translate i++ into:

Load   register, address of i
Add    register, 1
Store  register, address of i

So two threads can execute one "i++;" concurrently and the result of i appears to be increased only once. We could get such a H_C:

thread A:         IA1----------RA1(1)                  IA2------------RA2(3)
thread B:          |      IB1---|------RB1(1)    IB2----|----RB2(2)    |
                   |       |    |        |        |     |     |        |
                   |       |    |        |        |     |     |        |
real-time order:  IA1     IB1  RA1(1)  RB1(1)    IB2   IA2   RB2(2)   RA2(3)

Whatever you try to reorder the real-time order, you must not find a legel sequential history that equivalent to H_C.

We should rewrite the program:

//int i = 0; i is a global shared variable.
int inc_counter(){
    //do some unrelated work, for example, play a popular song.
    int j = i;
    //do some unrelated work, for example, fetch a web page and print it to the screen.
    return j;

OK, what is the linearization point of inc_counter()? The answer is the whole critial section. Because when a lot of threads repeatedly call the inc_counter(), the critical section will be executed atomically. And it can guarantee the correctness of the method. The Response of the method is the increamented value of global i. Consider the H_C like :

thread A:         IA1----------RA1(2)                 IA2-----------RA2(4)
thread B:          |      IB1---|-------RB1(1)    IB2--|----RB2(3)    |
                   |       |    |        |         |   |     |        |
                   |       |    |        |         |   |     |        |
real-time order:  IA1     IB1  RA1(2)  RB1(1)     IB2 IA2   RB2(3)   RA2(4)

Obviously, the equivalent sequential history is legal:

IB1 RB1(1) IA1 RA1(2) IB2 RB2(3) IA2 RA2(4)  //a legal sequential history

We have reorder the IB1~RB1 and IA1~RA1, because they're overlapped in the real time order, they can be reordered ambigously. In case of the H_C, we can reason that the critical section of the IB1~RB1 is entered first.

The example is too simple. Let's consider another one:

//top is the tio
void push(T val) {
    while (1) {
        Node * new_element = allocte(val);
        Node * next = top->next;
        new_element->next = next;
        if ( CAS(&top->next, next, new_element)) {  //Linearization point1
            //CAS success!
            //ok, we can do some other work, such as go shopping.
        //CAS fail! retry!

T pop() {
    while (1) {
        Node * next = top->next;
        Node * nextnext = next->next;
        if ( CAS(&top->next, next, nextnext)) { //Linearization point2
            //CAS succeed!
            //ok, let me take a rest.
            return next->value;
        //CAS fail! retry!

It's a lock-free stack algorithm full of bugs! but don't take care of the details. I just want to show the linearization point of push() and pop(). I have shown them in the comments. Consider many threads repeatedly call push() and pop(), they will be ordered at the CAS step. And other steps seem to be of no importance because whatever they concurrently executed, the final effect they will take on the stack(precisely top variable) is due to the order of the CAS step(linearization point). If we can make sure that the Linearization point really work, then the concurrent stack is correct. The picture of the H_C is too long, but we can confirm that there must be a legal sequential equivalent to H_C.

So if you are implementing a concurrent object, how to tell the correctness of you program? You should identify each method a linearization points and think carefully(or even prove) they will always hold the invariants of the concurrent object. Then the partial order of all the method calls can be extended to at least one legal total order(sequential history of events) that meet the sequential specification of the concurrent object.

Then you can say your concurrent object is correct.

As I explained in this article, a picture is worth 1000 words.

enter image description here

The first SELECT statement reads the value of 50, while the second SELECT reads the value of 10 since in between the two read operations a write operation was executed.

Linearizability means that modifications happen instantaneously, and once a registry value is written, any subsequent read operation will find the very same value as long as the registry will not undergo any modification.

What happens if you don't have Linearizability?

enter image description here

This time, we don’t have a single registry or a single source of truth. Our system uses asynchronous database replication, and we have a Primary node that takes both reads and writes and a Follower node used for read operations only.

Because replication happens asynchronously, there’s a lag between the Primary node row modification and the time when the Follower applies the same change.

One database connection changes the account balance from 50 to 10 and commits the transaction. Right after, a second transaction reads from the Follower node, but since replication did not apply the balance modification, the value of 50 is read.

Therefore, this system is not linearizable since changes don’t appear to happen instantaneously. In order to make this system linearizable, we need to use synchronous replication, and the Primary node UPDATE operation will not complete until the Follower node also applies the same modification.

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